Global Convergence of the Gursky-Malchiodi $Q$-curvature Flow

TL;DR

This paper proves the global convergence of the Gursky-Malchiodi $Q$-curvature flow in higher dimensions for all initial energies, extending previous results and employing advanced geometric and analytical techniques.

Contribution

It establishes the global convergence of the non-local $Q$-curvature flow for arbitrary initial energy, using a non-local ojasiewicz-Simon inequality and geometric analysis.

Findings

Proved global convergence of the flow for all initial energies.

Developed a non-local ojasiewicz-Simon inequality for the Paneitz-Sobolev quotient.

Constructed test bubbles and estimated their Paneitz-Sobolev quotients.

Abstract

In their seminal work, Gursky and Malchiodi introduced a non-local conformal flow in dimensions $n \geq 5$ to resolve the constant $Q$-curvature problem. They proved sequential convergence of the flow for initial metrics with positive scalar curvature and $Q$-curvature, provided the energy was sufficiently small. In this paper, we prove the global convergence of the flow for arbitrary initial energy under the same positivity assumptions by establishing a non-local version of the {\L}ojasiewicz-Simon inequality for the Paneitz-Sobolev quotient along the flow. We construct test bubbles and estimate their Paneitz-Sobolev quotients, a strategy that was carried out in the celebrated work of Brendle in the context of the Yamabe flow. We develop a more geometric and systematic proof that addresses the algebraic and computational complexity inherent in the $Q$-curvature and the Paneitz operator. Along the way, we derive a stability inequality for the Paneitz-Sobolev quotient using a higher-order Koiso-Bochner formula established in recent work of Bahuaud, Guenther, Isenberg, and Mazzeo.